On the number of components of twisted torus links

Abstract

Twisted torus links T(p,q;r,s) generalize torus links by introducing s additional twists on r adjacent strands of the torus link T(p,q). It is well known that the number of components of a torus link T(p, q) is given by the greatest common divisor of p and q. However, determining the number of components of twisted torus links is not as straightforward based solely on their parameters. In this work, we present a Euclidean algorithm-like procedure for computing the number of components of twisted torus links based on their parameters. As a result, we show that the number of components of a twisted torus link T(p, q; r, s) is a multiple of (p, q, r, s), and in particular, T(p, q; r, s) is a knot only if (p, q, r, s) = 1. We also use our algorithm to prove several conjectures related to the number of components in twisted torus links.